Norm in number fields #
Given a finite extension of number fields, we define the norm morphism as a function between the rings of integers.
Main definitions #
RingOfIntegers.norm K
:Algebra.norm
as a morphism(𝓞 L) →* (𝓞 K)
.
Main results #
RingOfIntegers.dvd_norm
: ifL/K
is a finite Galois extension of fields, then, for all(x : 𝓞 L)
we have thatx ∣ algebraMap (𝓞 K) (𝓞 L) (norm K x)
.
theorem
Algebra.coe_norm_int
{K : Type u_1}
[Field K]
[NumberField K]
(x : ↥(NumberField.ringOfIntegers K))
:
↑((Algebra.norm ℤ) x) = (Algebra.norm ℚ) ↑x
theorem
Algebra.coe_trace_int
{K : Type u_1}
[Field K]
[NumberField K]
(x : ↥(NumberField.ringOfIntegers K))
:
↑((Algebra.trace ℤ ↥(NumberField.ringOfIntegers K)) x) = (Algebra.trace ℚ K) ↑x
@[simp]
theorem
RingOfIntegers.norm_apply_coe
{L : Type u_1}
(K : Type u_2)
[Field K]
[Field L]
[Algebra K L]
[FiniteDimensional K L]
[IsSeparable K L]
(n : ↥(NumberField.ringOfIntegers L))
:
↑((RingOfIntegers.norm K) n) = (Algebra.norm K) ↑n
noncomputable def
RingOfIntegers.norm
{L : Type u_1}
(K : Type u_2)
[Field K]
[Field L]
[Algebra K L]
[FiniteDimensional K L]
[IsSeparable K L]
:
Algebra.norm
as a morphism betwen the rings of integers.
Equations
- One or more equations did not get rendered due to their size.
Instances For
theorem
RingOfIntegers.coe_algebraMap_norm
{L : Type u_1}
(K : Type u_2)
[Field K]
[Field L]
[Algebra K L]
[FiniteDimensional K L]
[IsSeparable K L]
(x : ↥(NumberField.ringOfIntegers L))
:
↑((algebraMap ↥(NumberField.ringOfIntegers K) ↥(NumberField.ringOfIntegers L)) ((RingOfIntegers.norm K) x)) = (algebraMap K L) ((Algebra.norm K) ↑x)
theorem
RingOfIntegers.coe_norm_algebraMap
{L : Type u_1}
(K : Type u_2)
[Field K]
[Field L]
[Algebra K L]
[FiniteDimensional K L]
[IsSeparable K L]
(x : ↥(NumberField.ringOfIntegers K))
:
↑((RingOfIntegers.norm K) ((algebraMap ↥(NumberField.ringOfIntegers K) ↥(NumberField.ringOfIntegers L)) x)) = (Algebra.norm K) ((algebraMap K L) ↑x)
theorem
RingOfIntegers.norm_algebraMap
{L : Type u_1}
(K : Type u_2)
[Field K]
[Field L]
[Algebra K L]
[FiniteDimensional K L]
[IsSeparable K L]
(x : ↥(NumberField.ringOfIntegers K))
:
(RingOfIntegers.norm K) ((algebraMap ↥(NumberField.ringOfIntegers K) ↥(NumberField.ringOfIntegers L)) x) = x ^ FiniteDimensional.finrank K L
theorem
RingOfIntegers.isUnit_norm_of_isGalois
{L : Type u_1}
(K : Type u_2)
[Field K]
[Field L]
[Algebra K L]
[FiniteDimensional K L]
[IsGalois K L]
{x : ↥(NumberField.ringOfIntegers L)}
:
IsUnit ((RingOfIntegers.norm K) x) ↔ IsUnit x
theorem
RingOfIntegers.dvd_norm
{L : Type u_1}
(K : Type u_2)
[Field K]
[Field L]
[Algebra K L]
[FiniteDimensional K L]
[IsGalois K L]
(x : ↥(NumberField.ringOfIntegers L))
:
x ∣ (algebraMap ↥(NumberField.ringOfIntegers K) ↥(NumberField.ringOfIntegers L)) ((RingOfIntegers.norm K) x)
If L/K
is a finite Galois extension of fields, then, for all (x : 𝓞 L)
we have that
x ∣ algebraMap (𝓞 K) (𝓞 L) (norm K x)
.
theorem
RingOfIntegers.norm_norm
{L : Type u_1}
(K : Type u_2)
[Field K]
[Field L]
[Algebra K L]
[FiniteDimensional K L]
(F : Type u_3)
[Field F]
[Algebra K F]
[IsSeparable K F]
[FiniteDimensional K F]
[IsSeparable K L]
[Algebra F L]
[IsSeparable F L]
[FiniteDimensional F L]
[IsScalarTower K F L]
(x : ↥(NumberField.ringOfIntegers L))
:
(RingOfIntegers.norm K) ((RingOfIntegers.norm F) x) = (RingOfIntegers.norm K) x
theorem
RingOfIntegers.isUnit_norm
(K : Type u_2)
[Field K]
{F : Type u_3}
[Field F]
[Algebra K F]
[IsSeparable K F]
[FiniteDimensional K F]
[CharZero K]
{x : ↥(NumberField.ringOfIntegers F)}
:
IsUnit ((RingOfIntegers.norm K) x) ↔ IsUnit x